Quantum Computing, Rieffel & Polak Chapters 1 and 2

Quantum Computing, Rieffel & Polak Chapters 1 and 2 Drs. Charles Tappert and Ron Frank The information presented here, although greatly condensed, comes almost entirely from the textbook

Chapter 1 – Introduction • Quantum computing is a beautiful combination of quantum physics, CS, and information theory • Includes quantum computing, quantum cryptography, quantum communications, and quantum games • Uses quantum mechanics rather than classical mechanics to model information and its processing • The book consists of three parts • Part I Quantum Building Blocks • Part II Quantum Algorithms • Part III Entanglement and Robust Quantum Computation

Chap 2 Single-Qubit Quantum Systems • Quantum bits are the fundamental units of information in quantum computing, just as bits are fundamental units in classical computing • There are many ways to realize classical bits • Similarly, there are many ways to realize qubits • We begin by examining the behavior of polarized photons, a possible realization of quantum bits

Chap 2 Single-Qubit Quantum SystemsQuantum mechanics of photon polarization • A simple experiment illustrates some of the non-intuitive behavior of quantum systems • Minimal equipment required • Laser pointer and three polarized lenses (polaroids) available from any camera supply store • 3D movies project the same scene into both eyes, but from slightly different perspectives • The viewer wears low-cost eyeglasses which contain a pair of different polarizing filters

Chap 2 Single-Qubit Quantum SystemsQuantum mechanics of photon polarization • Shine a beam of light on a projection screen • Insert polaroid A between light source and screen

Chap 2 Single-Qubit Quantum SystemsQuantum mechanics of photon polarization • Insert polaroid C between A and screen and rotate it

Chap 2 Single-Qubit Quantum SystemsQuantum mechanics of photon polarization • Finally, insert polaroid B between A and C

Chap 2 Single-Qubit Quantum SystemsQuantum mechanics of photon polarization • Turns out that the results of this experiment can be explained classically in terms of waves • The same experiment can be performed with more sophisticated equipment using a single-photon emitter to yield the same results • Results explained only with quantum mechanics • The explanation consists of two parts • Model of photon’s polarization state • Model of interaction between photon and polaroid

Chap 2 Single-Qubit Quantum SystemsQuantum mechanics of photon polarization • A photon’s polarization state can be represented by a superposition of base vectors • Now, when photon with polarization meets polaroid , the photon gets thru with prob a2 • The probability is the square of the coefficient

Chap 2 Single-Qubit Quantum SystemsQuantum mechanics of photon polarization • What happens when polaroid B with preferred axis is inserted? • We note that • Therefore, ½ of the photons get thru B • In summary, 1/8 of the photons get thru ABC • 1/2 get thru A, 1/2 get thru B, 1/2 get thru C

Chap 2 Single-Qubit Quantum SystemsQuantum mechanics of photon polarization

Chap 2 Single-Qubit Quantum SystemsSingle quantum bits • The set of the infinite number of possible states of a physical quantum system is called the state space • States of a two-state system can be represented in terms of two orthonormal basis states • The basis states can also be written as • Arbitrary state can be written as • This is a complex vector space with • Inner product satisfying (bra = , ket= )

Chap 2 Single-Qubit Quantum SystemsSingle-qubit measurement • Quantum theory postulates that any device that measures a two-state quantum system must have two preferred states whose representative vectors form an orthonormal basis for the associated vector space • And measurement of a state transforms the state into one of the measuring device’s associated basis vectors • And the probability the state is measured as is the square of the amplitude of that basis vector • For example, the state is measured as with probability a2

Chap 2 Single-Qubit Quantum SystemsQuantum key distribution protocol • Now we can describe the first application • Relies on quantum effects for security • Quantum key distribution protocol establishes a symmetric key between 2 parties, Alice & Bob • Alice & Bob connected by two public channels • Bidirectional classical channel • Unidirectional quantum channel for sending qubits • Channels observed by eavesdropper Eve

Chap 2 Single-Qubit Quantum SystemsQuantum key distribution protocol

Chap 2 Single-Qubit Quantum SystemsQuantum key distribution protocol • Alice generates a random sequence of bits • Random subset of sequence will be the private key • Alice randomly encodes each bit of the sequence in the polarization state of a photon • Randomly choosing for each bit one of the bases

Chap 2 Single-Qubit Quantum SystemsQuantum key distribution protocol • Alice sends the sequence of photons to Bob • Bob measures the state of each photon he receives by randomly picking either basis • Over the classical channel, Alice and Bob tell each other the bases they used for each bit • When choice of bases agree, Bob’s measured bit values agree with bit values Alice sent • Without revealing bit values, they discard all bits on which their bases differed (about 50%)

Chap 2 Single-Qubit Quantum SystemsQuantum key distribution protocol • About 50% of bits transmitted remain • Then Alice and Bob compare a certain number of bit values to check if eavesdropping occurred • The checked bits are also discarded • The remaining bits will now be used as the private key

Chap 2 Single-Qubit Quantum SystemsState space of single-qubit system • The state space of a quantum system is the set of all possible states of the system • The state space for a single qubit system, no matter how realized, is the set of qubit values

Chap 2 Single-Qubit Quantum SystemsState space of single-qubit system • Relative phases versus global phases • Global phase is • The multiple by which two vectors representing the same quantum state differ • It has no physical meaning • This is a common source of confusion for newcomers to the field

Chap 2 Single-Qubit Quantum SystemsState space of single-qubit system • The relative phase of superposition • Is a measure of the angle in the complex plane between the two complex numbers a and b • Specifically, it is the modulus one complex number • Two superpositions whose amplitudes have the same magnitudes but differ in relative phase represent different states • The physically meaningful relative phase and the physically meaningless global phase should not be confused

Chap 2 Single-Qubit Quantum SystemsState space of single-qubit system • Geometric views of single qubit state space • Two ways of looking at complex projective space • 1. Extended complex plane • Complex plane C with additional point labeled • 2. Bloch sphere

Chap 2 Single-Qubit Quantum SystemsState space of single-qubit system • Extended complex plane (with added ) • Correspondence between the set of all complex numbers and single-qubit states

Chap 2 Single-Qubit Quantum SystemsState space of single-qubit system • Bloch sphere • Starting with the previous representation, map each state represented by the complex number onto the unit sphere in 3D • The points via the standard stereographic projection map

Chap 2 Single-Qubit Quantum SystemsState space of single-qubit system

Chap 2 Single-Qubit Quantum SystemsState space of single-qubit system • 3 representations of single-qubit state space • 1. Vectors in ket notation with complex coeficients subject to • Where are unique up to a unit complex factor • Representation not one-to-one • 2. Extended complex plane • One-to-one representation • 3. Bloch sphere • One-to-one representation

Quantum Computing, Rieffel & Polak Chapters 1 and 2